To determine the angle between the hour and minute hands of a clock at a specific time in the PM, you can use the formula: Angle = |(30*hour - (11/2)minutes)|. For example, at 3:00 PM, the angle would be |(303 - (11/2)*0)| = 90 degrees. The angle varies based on the specific time, with each hour marking a 30-degree difference between the hour hand positions.
20 degrees
Each minute on the clock is 1/60 of the 360 degree circle or 6 degrees. There are 20 minute lines between 12 and 4 therefore, 20 times 6 is 120 degrees.
3:00 am, 3:00 pm, 9:00 am, 9:00 pm
About 4:22
The hands of a clock cross each other 11 times between 4 AM and 4 PM. This is because the minute hand moves faster than the hour hand, and they cross approximately every 65 minutes. Since there are 12 hours between 4 AM and 4 PM, they will cross 11 times during that period.
1200
22215 pm is not a correct time, what time do you mean? The angle between the hands, if that is what you mean by 'the angle of the clock', does not depend on the length of the hands, so why have you given them? Please make the question clear and resubmit.
210 degrees
20 degrees
Each minute on the clock is 1/60 of the 360 degree circle or 6 degrees. There are 20 minute lines between 12 and 4 therefore, 20 times 6 is 120 degrees.
11 times.
120
3:00 am, 3:00 pm, 9:00 am, 9:00 pm
About 4:22
The hands of a clock cross each other 11 times between 4 AM and 4 PM. This is because the minute hand moves faster than the hour hand, and they cross approximately every 65 minutes. Since there are 12 hours between 4 AM and 4 PM, they will cross 11 times during that period.
4:21:49.5
At 12:50 PM, the minute hand points at the 10, indicating 50 minutes past the hour, while the hour hand is slightly past the 12. The hour hand is positioned just a bit ahead of the 12, reflecting that it's almost 1:00 PM. The clock face would show the hour hand slightly between the 12 and 1, and the minute hand pointing directly at the 10.